Weak type $A_p$ estimate for bilinear Calderón-Zygmund operators (2312.13635v1)

Abstract: In this paper, we investigate the boundedness of bilinear Calder\'on-Zygmund operators $T$ from ${L^{p_1}\left(w_1\right)} \times {L^{p_2}\left(w_2\right)}$ to ${L^{p,\infty}\left(v_{\vec{w}}\right)}$ with the stopping time method, where $1 / p = 1 / p_1 + 1 / p_2$ , $1 < p_1, p_2 < \infty$ and $\vec{w}$ is a multiple $A_{\vec{P}}$ weight. Specifically, we studied the exponent $\alpha$ of $A_{\vec{P}}$ constant in formula $$|T(\vec{f})|{L^{p,\infty}\left(v{\vec{w}}\right)} \leqslant C_{m, n, \vec{P}, T}[\vec{w}]{A{\vec{P}}}^{\alpha}\left|f_1\right|{L^{p_1}\left(w_1\right)}\left|f_2\right|{L^{p_2}\left(w_2\right)}.$$ Surprisingly, we show that when $p \geqslant \frac{3+\sqrt{5}}{2}$ or $\min{p_1,p_2} > 4$, the index $\alpha$ in the above equation can be less than $1$, which is different from the linear scenario.